AbstractWe study the asymptotic behavior of maximum values of birth and death processes over large time intervals. In most cases, the distributions of these maxima, under standard linear normalizations, either do not converge or they converge to a degenerate distribution. However, by allowing the birth and death rates to vary in a certain manner as the time interval increases, we show that the maxima do indeed have three possible limit distributions. Two of these are classical extreme value distributions and the third one is a new distribution. This third distribution is the best one for practical applications. Our results are for transient as well as recurrent birth and death processes and related queues. For transient processes, the focus...
We survey a method initiated by one of us in the 1990's for finding bounds and representations for t...
This research determined the manner of convergence of certain Markov processes to their steady state...
Service life of many real-life systems cannot be considered infinite, and thus the systems will be e...
We study the asymptotic behavior of maximum values of birth and death processes over large time inte...
AbstractWe study the asymptotic behavior of maximum values of birth and death processes over large t...
In this paper, we present the extension of the analysis of time-dependent limiting characteristics t...
In this paper we consider nonhomogeneous birth and death processes (BDP) with periodic rates. Two im...
Birth-death processes are discrete-state, continuous-time Markov jump processes with one-step jumps....
Let N(t) be a birth-death process on {0,1,...} with state 0 reflecting and let qTK be the quasi-stat...
The objective of this note is to study the distribution of the running maximum of the level in a lev...
The model of a two-dimensional birth-death process with possible catastrophes is studied. The upper ...
For an ergodic continuous-time birth and death process on the nonnegative integers, a well-known the...
The model of a two-dimensional birth-death process with possible catastrophes is studied. The upper ...
This paper considers the cycle maximum in birth-death processes as a stepping stone to characterisat...
The present state of extreme value theory for queues is surveyed. The exposition focuses on the rege...
We survey a method initiated by one of us in the 1990's for finding bounds and representations for t...
This research determined the manner of convergence of certain Markov processes to their steady state...
Service life of many real-life systems cannot be considered infinite, and thus the systems will be e...
We study the asymptotic behavior of maximum values of birth and death processes over large time inte...
AbstractWe study the asymptotic behavior of maximum values of birth and death processes over large t...
In this paper, we present the extension of the analysis of time-dependent limiting characteristics t...
In this paper we consider nonhomogeneous birth and death processes (BDP) with periodic rates. Two im...
Birth-death processes are discrete-state, continuous-time Markov jump processes with one-step jumps....
Let N(t) be a birth-death process on {0,1,...} with state 0 reflecting and let qTK be the quasi-stat...
The objective of this note is to study the distribution of the running maximum of the level in a lev...
The model of a two-dimensional birth-death process with possible catastrophes is studied. The upper ...
For an ergodic continuous-time birth and death process on the nonnegative integers, a well-known the...
The model of a two-dimensional birth-death process with possible catastrophes is studied. The upper ...
This paper considers the cycle maximum in birth-death processes as a stepping stone to characterisat...
The present state of extreme value theory for queues is surveyed. The exposition focuses on the rege...
We survey a method initiated by one of us in the 1990's for finding bounds and representations for t...
This research determined the manner of convergence of certain Markov processes to their steady state...
Service life of many real-life systems cannot be considered infinite, and thus the systems will be e...